What value is there in requiring students to answer word problems in complete sentences?

Question

This is related to my previous question What value is there in requiring students to declare the dimensions of an answer when it is already clear from context? , but with a different focus.

A sizeable minority of my primary and secondary school teachers (east-coast US in the late 1980's/early 1990's) insisted that word problems be answered in complete sentences.

Consider the following hypothetical question:

Anne's car travels 225 miles in five hours. What is the speed of Anne's car?

The correct answer, according to these teachers, would be

The speed of Anne's car is 45 mph.

Some leeway in wording was allowed, so an answer of "Anne's car has a speed of 45 mph", "45mph is the speed of Anne's car", or "Anne's car travels at a 45mph speed" could be accepted for full credit, but answers such as "45" or even "45 mph" were considered insufficient and would result at best in lost points and at worst in being awarded zero points for the question.

The explanation that I recall being given was that we were being educated to use math to communicate information to others in real-life contexts, and that context was always necessary. For example, if we walked up to an adult and told them "45 mph!", they would look at us like we were crazy and wonder what it is we were trying to communicate, but if we instead presented them with "The speed of Anne's car is 45 mph", they would instead react, "Wow! I've always wondered about that. Thanks!" and would be sure to lavish us with awards and college recommendation letters.

The school system I spent most of my childhood years in was (at that time) very big into interdisciplinary and cross-curricular studies. We were supposed to write papers about math, do math problems on real history, study the history of science, etc., so my understanding was that the requirement to write answers in complete sentences was an exercise in literacy and not mathematics per se.

So, is there mathematical pedagogical value in requiring students to answer word problems in complete sentences, or is this actually a literacy or communication exercise that has been applied interdisciplinarily to math exercises?

Answer 1

Yes, there is mathematical pedagogical value in the usage of complete sentences - but this does not only refer to "answers" and not only to "word problems", but to all parts of the solution to any mathematical problem or task.

The reason is that mathematics is not only about numbers, or computations, or equations, or inequalities. It is also (some people might say: mainly) about how to precisely formulate mathematical arguments and propositions. Propositions and arguments are typically composed of complete sentences.

One of the various challenges that I perceive whenever dealing with first year math students at university level is that they find it very difficult to express their mathematical thoughts in a precise and clearly understandable way - and part of this problem is that most of them didn't learn in math classes in school to express themselves in complete sentences.

Answer 2

I do think there is value in expecting students to give answers in correct English. It will certainly help when they start to face longer and less structured questions.

However, the example you give is entirely inappropriate. When you are asked a direct question, it is correct English to simply respond with the answer. You do not need to prefix it with "The answer to your question is", or words of like meaning. Requiring this sort of thing just becomes an artificial constraint designed to trip people up, rather like Jeopardy.

Answer 3

An example of a problem where phrasing the answer as a sentence might prevent mistakes and encourage understanding is:

Alice goes to the store with \$2.00. A gumball costs \$0.80. How many gumballs can Alice buy?

A careless student might write

$\$2.00\ /\ \$0.80 = 2.5$

but writing out

"Alice can buy 2.5 gumballs" might make them think again. Relating the numbers to an assertion about reality could plausibly help students check that the answers they obtain are reasonable.

Answer 4

Jochen's answer is very good. To add to it, here's the reasoning I was given as a student: answering in full sentences makes students think about the answer in different psychological context. This can help them catch mistakes.

For example, imagine the student answering the question had made the common mistake of dividing the hours by the distance instead of the other way around, and got an answer of 0.0222. Writing the answer as a full sentence ("The speed of Anne's car is 0.0222mph") might well prompt them to realize that they've made an error.

Answer 5

I do think this has (some) pedagogical value, specifically for word problems.

Word problems are designed to give students practice applying math to real-world situations. Doing this effectively means you want the students to understand the situation being described, and think about how math can apply to it. (This also requires that your word problems be realistic; if the real-world answer is "that's nonsense", it's a bad word problem for a math class.)

What you don't want is for the student to scan the problem looking for two numbers, and a mathematical operation to apply to them. Requiring the student to restate the situation at hand, and how the number they're giving fits into that situation, is one way to tell if they've read the problem thoroughly, which is a component to understanding it.

Answer 6

The answer to What is the speed of Anne's car? is simply 45 mph

However, math problems such as this follow a very simple pattern of pick up every number and do something with them, so with a simple scan of the text, the answer must be one of

• 230
• 220
• 1125
• 45

(-220 or 0,022… would be 'unlikely' answers)

which is exactly what some students will do: picking one of them seemingly at random, without paying any attention to the wording.

This can lead to interactions with certain students such as:

• Teacher: What's the speed of Anne's car?
• Student: 230!
• Teacher gives look of "this is not the right answer"
• Student: I meant 220!
• Teacher: Are you sure?
• Student: 1125!, 1125!

A full answer of

The speed of Anne's car is 45 mph.

requires from the student not only to read the numbers and guess the right operation (perhaps all the tasks today are divisions?), but also to parse the subject of the sentence (Anne's car), the property being sought (its speed) and build a full sentence out of it.

(Omegastick points out that an implausible value associated to a sentence might prompt them to realize that they've made an error. But I wouldn't hold my breath. I think their parents are more likely to notice from the context that the car is probably not going at 0.022 mph. If the students suspect it may be wrong, that probably stems from the answer not being an integral number.)

As a nitpick, I should note that the above answer is still not complete. If we get fancy, we should say that

The speed of Anne's car is 45 mph on average.

Answer 7

I don't think there's a mathematical reason for this, but teachers may view this as part of an interdisciplinary approach. Requiring students to answer in complete sentences reinforces what they're learning in language class, by having them write complete, grammatical sentences.

I recall similar requirements in other classes. For instance, in History class, if asked when the US declared its independence, you were expected to say something like "The Declaration of Independence was signed in 1776" rather than just "1776".